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Physics 222: Modern Physics for Engineers Fall 2013   Instructor: Hans Schuessler Website: http://sibor.physics.tamu.edu Office: 213B.

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Presentation on theme: "Physics 222: Modern Physics for Engineers Fall 2013   Instructor: Hans Schuessler Website: http://sibor.physics.tamu.edu Office: 213B."— Presentation transcript:

1 Physics 222: Modern Physics for Engineers Fall 2013   Instructor: Hans Schuessler Website: Office: 213B Course objectives: To learn the physics of the 20th century Course outcomes: Know the basic laws of relativity, quantum and atomic physics, nuclear physics ad solid state physics.   Text: Modern Physics for Scientists and Engineers by S. Thornton and A. Rex, 4th Edition, ISBN:

2 CHAPTER 1 1.1 Classical Physics of the 1890s
"The eternal mystery of the world is its comprehensibility.“ "Anyone who has never made a mistake has never tried anything new." A. Einstein 1.1 Classical Physics of the 1890s 1.2 The Kinetic Theory of Gases 1.3 Waves and Particles 1.4 Conservation Laws and Fundamental Forces 1.5 The Atomic Theory of Matter 1.6 Unresolved Questions of 1895 and New Horizons

3 1.1: Classical Physics of the 1890s
Mechanics Electromagnetism Thermodynamics

4 CONSERVATION LAWS MECHANICS CLASSICAL PHYSICS 1.1 ELECTRICITY
AND MAGNETISM THERMODYNAMICS MECHANICS CLASSICAL PHYSICS 1.1 CONSERVATION LAWS

5 Triumph of Classical Physics: The Conservation Laws
Conservation of energy: The total sum of energy (in all its forms) is conserved in all interactions. Conservation of linear momentum: In the absence of external forces, linear momentum is conserved in all interactions. Conservation of angular momentum: In the absence of external torque, angular momentum is conserved in all interactions. Conservation of charge: Electric charge is conserved in all interactions.

6 Mechanics Galileo Galilei (1564-1642) Great experimentalist
Principle of inertia Established experimental foundations

7 Kinematics equations for constant acceleration
General formulas:

8

9 Testing Kinetics for a=9.80m/s2

10 All objects fall with the same constant acceleration!!

11 Isaac Newton ( ) Three laws describing the relationship between mass and acceleration. Newton’s first law (law of inertia): An object in motion with a constant velocity will continue in motion unless acted upon by some net external force. Newton’s second law: Introduces force (F) as responsible for the change in linear momentum (p): Newton’s third law (law of action and reaction): The force exerted by body 1 on body 2 is equal in magnitude and opposite in direction to the force that body 2 exerts on body 1.

12 Inertial Frames K and K’
K is at rest and K’ is moving with velocity Axes are parallel K and K’ are said to be INERTIAL COORDINATE SYSTEMS

13 The Galilean Transformation
For a point P In system K: P = (x, y, z, t) In system K’: P = (x’, y’, z’, t’) P x K K’ x’-axis x-axis

14 pulling a sled, Michelangelo’s assistant
For forward motion: FAG> FAS FSA > FSG

15 Gravitation Newton’s Law of Gravitation

16 Cavendish balance Light source ( ) Henry Cavendish(1798) announced that he has weighted the earth.

17

18 Electromagnetism: 18th-19th centuries
Contributions made by: Coulomb ( ) Oersted ( ) Young ( ) Ampère ( ) Faraday ( ) Henry ( ) Maxwell ( ) Hertz ( )

19 Culminates in Maxwell’s Equations
Gauss’s law (ΦE): (electric field) Gauss’s law (ΦB): (magnetic field) Faraday’s law: Ampère’s law: (Generalized) Lorentz law: (force) Gauss (1777 –1855)

20 Thermodynamics Contributions made by:
Benjamin Thompson ( ) (frictional heat) (Count Rumford) Sadi Carnot ( ) (heat engine and Carnot cycle) James Joule ( ) (mechanical equivalent of heat)) Rudolf Clausius ( ) (heat can never pass from a colder to a warmer body without some other change) William Thompson ( ) (Lord Kelvin) (proposed absolute temperature scale)

21 Primary Results Deals with temperature, heat, work, and the internal energy of systems Introduces thermal equilibrium The first law establishes heat as energy and expresses conservation of energy Introduces the concept of internal energy and considers temperature as a measure of internal energy Introduces limitations of the energy processes that can or cannot take place

22 The Laws of Thermodynamics
First law: The change in the internal energy ΔU of a system is equal to the heat Q added to a system plus the work W done on the system ΔU = Q + W Second law: It is not possible to convert heat completely into work without some other change taking place. The “zeroth” law: Two systems in thermal equilibrium with a third system are in thermal equilibrium with each other. Third law: It is not possible to achieve an absolute zero temperature.

23 1.2: The Kinetic Theory of Gases
Contributions made by: Robert Boyle ( ) Jacques Charles ( ) Joseph Louis Gay-Lussac ( ) Culminates in the ideal gas equation for n moles of a “simple” gas: PV = nRT (where R is the ideal gas constant, 8.31 J/(mol · K)

24 Additional Contributions
Amedeo Avogadro ( ) (number of molecules in a mole and their weights) John Dalton ( ) (atomic theory of elements) Daniel Bernoulli ( ) (kinetic theory of gases) Ludwig Boltzmann ( ) (kinetic theory of gases, entropy as log() of probability) James Clerk Maxwell ( ) (velocity distribution) J. Willard Gibbs ( ) (thermodynamic and chemical potentials)

25 Avogadro’s number: number of molecules in 1 mole)
Primary Results Average molecular kinetic energy directly related to absolute temperature Internal energy U directly related to the average molecular kinetic energy Internal energy equally distributed among the number of degrees of freedom (f ) of the system containing n moles of substance (NA = 6.022×1023 mol−1 Avogadro’s number: number of molecules in 1 mole)

26 Primary Results 1. The molar heat capacity (cV) is given by
R=8.31 J/(mol K)

27 Other Primary Results 2. Maxwell derives a relation for the molecular speed distribution f (v): 3. Boltzmann contributes to determine the root-mean-square of the molecular speed Thus relating energy to the temperature for an ideal gas

28 Molecular speeds in an ideal gas
21

29 1.3: Waves and Particles Two ways in which energy is transported:
Point mass interaction: transfers of momentum and kinetic energy: particles Extended regions wherein energy transfers by way of vibrations and rotations are observed: waves

30 Particles vs. Waves Two distinct phenomena describing physical interactions Particles in the form of point masses and waves in the form of perturbation in a mass distribution, i.e., a material medium The distinctions are observationally quite clear; however, not so for the case of visible light Thus by the 17th century begins the major disagreement concerning the nature of light

31 The Nature of Light Contributions made by: Isaac Newton (1642-1742)
Christian Huygens ( ) Thomas Young ( ) Augustin Fresnel (1788 – 1829)

32 The Nature of Light Newton suggested the corpuscular (particle) theory
Particles of light travel in straight lines or rays Explained sharp shadows Explained reflection and refraction

33 The Nature of Light Christian Huygens promoted the wave theory
Light propagates as a wave of concentric circles from the point of origin Explained reflection and refraction Did not explain sharp shadows

34 The Wave Theory Advances…
Contributions by Huygens, Young, Fresnel and Maxwell Double-slit interference patterns Refraction of light from a vacuum to a medium Light is an electromagnetic phenomenon Establishes that light propagates as a wave

35 The Electromagnetic Spectrum
Visible light covers only a small range of the total electromagnetic spectrum All electromagnetic waves travel in a vacuum with a speed c given by: (where μ0 and ε0 are the respective permeability and permittivity of “free” space)

36 1.4: Conservation Laws and Fundamental Forces
Recall the fundamental conservation laws: Conservation of energy Conservation of linear momentum Conservation of angular momentum Conservation of electric charge Later we will establish the conservation of mass as part of the conservation of energy

37 Modern Results In addition to the classical conservation laws, two modern results will include: The conservation of baryons and leptons The fundamental invariance principles for time reversal, distance, and parity

38 Also in the Modern Context…
The three fundamental forces are introduced Gravitational: Electroweak Weak: Responsible for nuclear beta decay and effective only over distances of ~10−15 m Electromagnetic: (Coulomb force) Strong: Responsible for “holding” the nucleus together and effective less than ~10−15 m

39 Unification Neutrons and protons are composed of quarks, which have the color force acting between them Grand Unified Theory (GUT) attempts to unify electroweak and strong forces String theory is one of these They have yet to be verified experimentally

40 Unification of Forces Maxwell unified the electric and magnetic forces as fundamentally the same force; now referred to as the electromagnetic force In the 1970’s Glashow, Weinberg, and Salem proposed the equivalence of the electromagnetic and the weak forces (at high energy); now referred to as the electroweak interaction

41 Goal: Unification of All Forces into a Single Force

42 1.5: The Atomic Theory of Matter
Initiated by Democritus and Leucippus (~450 B.C.) (first to us the Greek atomos, meaning “indivisible”) In addition to fundamental contributions by Boyle, Charles, and Gay-Lussac, Proust (1754 – 1826) proposes the law of definite proportions Dalton advances the atomic theory of matter to explain the law of definite proportions Avogadro proposes that all gases at the same temperature, pressure, and volume contain the same number of molecules (atoms); viz × 1023 atoms per mole Cannizzaro (1826 – 1910) makes the distinction between atoms and molecules advancing the ideas of Avogadro.

43 Further Advances in Atomic Theory
Maxwell derives the speed distribution of atoms in a gas Robert Brown (1753 – 1858) observes microscopic “random” motion of suspended grains of pollen in water Einstein in the 20th century explains this random motion using atomic theory

44 Opposition to the Theory
Ernst Mach (1838 – 1916) opposes the theory on the basis of logical positivism, i.e., atoms being “unseen” place into question their reality Wilhelm Ostwald (1853 – 1932) supports this premise but on experimental results of radioactivity, discrete spectral lines, and the formation of molecular structures

45 Overwhelming Evidence for Existence of Atoms
Max Planck (1858 – 1947) advances the concept to explain blackbody radiation by use of submicroscopic “quanta” Boltzmann requires existence of atoms for his advances in statistical mechanics Albert Einstein (1879 – 1955) uses molecules to explain Brownian motion and determines the approximate value of their size and mass Jean Perrin (1870 – 1942) experimentally verifies Einstein’s predictions

46 1.6: Unresolved Questions of 1895 and New Horizons
The atomic theory controversy raises fundamental questions It was not universally accepted The constitutes (if any) of atoms became a significant question The structure of matter remained unknown with certainty

47 Further Complications
Three fundamental problems: The question of the existence of an electromagnetic medium The problem of observed differences in the electric and magnetic field between stationary and moving reference systems The failure of classical physics to explain blackbody radiation

48 Additional Discoveries Contribute to the Complications
Discovery of x-rays Discovery of radioactivity Discovery of the electron Discovery of the Zeeman effect

49 The Beginnings of Modern Physics
These new discoveries and the many resulting complications required a revision of the fundamental physical assumptions that culminated in the huge successes of physics To this end, the introduction of the modern theory of relativity and quantum mechanics becomes the starting point of this most fascinating revision.

50 Homework assignment: Problems 2.1. #1,2 2.2. #4


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